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Atomic Structure
What is an atom?
I. Atom: the smallest unit of matter that retains the identity of the substance
II. First proposed by Democratus
Atomic Structure
I. Atoms are composed of 2 regions: A. Nucleus: the center of the atom that contains the mass of the
atom
B. Electron cloud: region that surrounds the nucleus that contains most of the space in the atom
Nucleus Electron
Cloud
What’s in the Nucleus?
I. The nucleus contains 2 of the 3 subatomic particles: A. Protons: positively charged subatomic particles
B. Neutrons: neutrally charged subatomic particles
What’s in the Electron Cloud? I. The 3rd subatomic particle resides outside of the nucleus in the
electron cloud A. Electron: the subatomic particle with a negative charge and
relatively no mass
How do these particles interact?
I. Protons and neutrons live compacted in the tiny positively charged nucleus accounting for most of the mass of the atom
II. The negatively charged electrons are small and have a relatively small mass but occupy a large volume of space outside the nucleus
How do the subatomic particles balance each other?
I. In an atom: A. The protons = the electrons
1) If 20 protons are present in an atom then 20 electrons are there to balance the overall charge of the atom—atoms are neutral
B. The neutrons have no charge; therefore they do not have to equal the number of protons or electrons
How do we know the number of subatomic particles in an atom?
I. Atomic number: this number indicates the number of protons in an atom A. Ex: Hydrogen’s atomic number is 1
1) So hydrogen has 1 proton
B. Ex: Carbon’s atomic number is 6 1) So carbon has 6 protons
**The number of protons identifies the atom.
Ex. 2 protons = He, 29 protons = Cu
I. Mass number: the number of protons and neutrons in the nucleus A. Ex: hydrogen can have a mass of 3.
Since it has 1 proton it must have 2 neutrons
A. # of neutrons = mass # - atomic #
How do we know the number of subatomic particles in an atom?
Determining the number of protons and neutrons
I. Li has a mass number of 7 and an atomic number of 3 A. Protons = 3 (same as atomic #) B. Neutrons= 7-3 = 4 (mass # - atomic #)
II. Ne has a mass number of 20 and an atomic number of 10 A. Protons = 10 B. Neutrons = 20 - 10= 10
What about the electrons?
I. The electrons are equal to the number of protons A. So e- = p = atomic #
II. Ex: He has a mass # of 4 and an atomic # of 2 A. p+ = 2 B. no = 2 C. e- = 2
Determine the number of subatomic particles in the
following: I. Cl has a mass # of 35 and an atomic # of 17
A. p+ = 17, no = 18, e- = 17
II. K has a mass # of 39 and an atomic # of 19 A. P+ = 19, no = 20 e- = 19
How exactly are the particles arranged?
I. Bohr Model of the atom: Reviewers think this could lead to misconceptions!
All of the protons and the neutrons
The 1st ring can hold up to 2 e-
The 2nd ring can hold up to 8 e-
The 3rd ring can hold up to 18 e-
The 4th ring and any after can hold up to 32 e-
What does carbon look like?
Mass # = 12 atomic # = 6
p+ = 6 no = 6 e- = 6
6 p and 6 n live in the nucleus
Applications of Quantum Mechanics
1) Quantum Numbers
a) n = principle quantum number = responsible for Energy of electron
b) l = orbital angular momentum = responsible for shape of orbital
c) ml = magnetic angular momentum = responsible for orbital position in space
d) ms = spin angular momentum = describes orientation of e- magnetic moment
e) When no magnetic field is present, all ml values have the same energy and
both ms values have the same energy
f) Together, n, l, and ml define one atomic orbital
2)Spherical Coordinates
a) Cartesian Coordinates: x, y, z define a point
b) Spherical Coordinates: r, q, f define a point
i. r = distance from nucleus for the electron
ii. q = angle from the z-axis (from 0 to p)
iii. f = angle from the x-axis (from 0 to 2p)
Conversions:
x = r sinq cosf
y = r sinq sinf
z = r cosq
Spherical Volumes:
3 sides = rdq, r sinq df, and dr
V = product = r2 sinq dq df dr
Volume of shell between r and r + dr
p p
fqp0
2
0
24 drddrrV
c) In Spherical Coordinates, Y is the product of the angular factors
i. Radial factor describes e- density at different distances from nucleus
ii. Angular factor describes shape of orbital and orientation in space
iii. Y(r,q,f) = R(r)Q(q)F(f) = R(r)Y(qf) [Y combines angular factors]
3)The Radial Function
a) R(r) is determined by n, l
b) Bohr Radius = ao =52.9 pm = r at Y2 maximum probability for a H 1s orbital
i. Used as a unit of distance for r in quantum mechanics (r = 2ao, etc…)
c) Radial Probability Function = 4pr2R2
i. Describes the probability of finding e- at a given distance over all angles
ii. Plots of R(r) and 4pr2R2 use r scale with ao units
iii. Electron Density falls off rapidly as r increases
iv. For 1s, probability = 0 by the time r = 5ao
v. For 3d, max prob is at r = 9ao ; prob = 0 at r = 20ao
vi. All orbitals have prob = 0 at the nucleus 4pr2R2 = 0 at r = 0
vii. Maxima: combination of rapid increase of 4pr2 with r and the rapid
decrease of R2 with r
viii. Shape and distance of e- from nucleus determine reactivity (valence)
Radial Probability Functions
4)The Angular Functions
a) q(q) and F(f) show how the probability changes at the same distance, but
different angles = shape/orientation of the atomic orbitals
b) Angular factors are determined by l and ml
i. Table 2-2
ii. Center = shape due to q portion only
iii. Far right = shape due to q and f = 3d orbital shape
iv. Shaded lobes = where Y is negative
v. Y2 = probability is same for +/-, but useful for bonding
5)Nodal Surfaces = surfaces where Y2 = 0 (Y changes sign)
a) Appear naturally from Y mathematical forms
b) 2s orbital: Y changes sign at r = 2ao giving a nodal sphere
c) Y2 = prob = 0 for finding the electron here
d) Y(r,q,f) = R(r)Y(q,f) and Y2 = 0
i. Either R(r) = 0 or Y(q,f) = 0
ii. Determines Nodal Surfaces by finding these conditions
e) Radial Nodes = Spherical Nodes R(r) = 0
i. Gives Layered appearance of orbitals
ii. R(r) changes sign
iii. 1s, 2p, 3d have no radial nodes
iv. Number of radial nodes increases with n
v. Number of radial nodes = n – l -1
C. The Aufbau Principle = the Build-Up Principle
1) Multi-electron atoms have limitations
a) Any combination of Q#’s works for a 1-electron atom
b) Electrons will have to interact in multi-electron systems
2) Rules
a) Electrons are placed in orbitals to give the lowest energy
i. Lowest values of n and l filled first
ii. Values of ml and ms don’t effect energy
b) Pauli Exclusion Principle = every e- has a unique set of quantum numbers
i. At least on Q# must be different: 2 e- in same orbital have ms = +/- ½
ii. Not derived from Schrödinger Equation; Experimental Observation
c) Hund’s Rule = always maximum spin if you have degenerate orbitals
i. 2 e- in same orbital higher energy than 1 e- each in degenerate orbitals
ii. Electrostatic repulsion explains this (Coulombic Repulsion E = Pc)
iii. Multiplicity = # of unpaired e- + 1 (n + 1)
iv. Exchange Energy = Pe = quantum mechanical result depending on the
possible number of exchanges of 2 e- with same E/spin
v. 2p2 example
__ __ __ __ __ __ __ __ __ __ __ __
vi. P = total pairing E = Pc + Pe
Pc = + and approximately constant
Pe = - and approximately constant
Favors the unpaired configuration
vii. Another example p4 and Exercise 2-3
__ __ __ vs. __ __ __
1Pc – 3Pe 2Pc – 2Pe
Lowest E
1 2 2 1
+ 1 Pc, 0 Pe 0 Pc, 0Pe 0 Pc, -1Pe
Increasing Energy
D) Shielding
1) Predicting exact order of e- filling is difficult
2) Shielding Provides an approach to figuring it out
a) Each e- acts as a shield for e- farther out
b) This reduces the attraction to the nucleus, increasing E
3) Figure 2-10 is the accepted energy ordering
a) n is most important
b) l does change order for multi-electron systems
4) As Z increases, the attraction for e- increases and
the Energy of the orbitals decreases irregularly
a) Table 2-6 gives actual e- configurations
5) Slater’s Rule: Z* = effective nuclear attraction = Z – S
a) Grouping: 2s,2p/3s,3p/3d/4s,4p/4d/4f/5s5p
b) e- in higher groups don’t shield lower groups
c) For ns/np valence e-
i. e- in same group contributes 0.35 (1s = 0.3)
ii. e- in n-1 group contributes 0.85
iii. e- in n-2 group contributes 1.00
d) For nd/nf valence electrons
i) e- in same group contributes 0.35
ii) e- in groups to the left contribute 1.00
e) S = sum of all contributions
6) Examples
a) Oxygen: (1s2)(2s22p4) Z* = Z – S = 8 – 2(0.85) – 5(0.35) = 4.55
Last e- held 4.55/8.00 = 57% of force expected for 8+ nucleus
b) Nickel: (1s2)(2s22p6)(3s23p6)(3d8)(4s2)
Z* = 28 – 10(1.00) – 16(0.85) – 1(0.35) = 4.05 for 4s electron
Ni2+ loses 4s2 electrons, not 3d electrons first (d8 metal)
c) Exercises 2-4, 2-5
7) Why does it work? (Figure 2-6)
a) 3s,3p 100% shield 3d because their probability is higher than 3d near
nucleus = shielding
b) 2s,2p only shield 3s,3p 85% because 3s/3p have significant regions of high
probability near the nucleus
8) Why are Cr [Ar]4s13d5 and Cu [Ar]4s13d10
a) Traditional Explanation: filled and half-filled subshells are particularly stable
b) Electron Interaction Model
i. 2 parallel E levels having only one kind of spin
ii. Separated by Pc amount of Energy
iii. E levels slant downward as Z increases (more attraction)
iv. 3d orbitals slant faster than 4s, which has more complete shielding
v. Fill from bottom up with only e- of one spin type
Ti __ __ __ __ __ 3d
__ 4s
4s23d2 __ 4s
Fe __ __ __ __ __ 3d
__ __ __ __ __ 3d
__ 4s
4s23d6 __ 4s
Cr __ 4s
__ __ __ __ __ 3d
4s13d5 __ 4s
Cu __ 4s
__ __ __ __ __ 3d
__ 4s
__ __ __ __ __ 3d
4s13d10
c) Formation of cations: lowers d energy more than s energy, so transition
metals always lose s electrons first
III. Periodic Properties
A) Ionization Energy
1) An+(g) ----> A(n+1)+(g) + e- DU = Ionization Energy
2) Trends
a) Increase in DU across period as Z increases so does the attraction to e-
b) Breaks in trend
i. B p-orbital 2s22p1 easier to remove
ii. O 2s22p4 paired e- easier to remove __ __ __
iii. Similar pattern in other periods
c) Transition Metals have only small differences
i) Increased shielding
ii) Increased distance from nucleus
d) Large decreases at start of new period because new s-orbital much higher E
e) Noble gases decrease as Z increases because e- are farther from nucleus
A. Electron Affinity
1) A-(g) ----> A(g) + e- DU = EA
2) Endothermic except for noble gases and Alkaline Earths
3) More precisely, this is the Zeroth Ionization Energy
a) Similar trends to Ionization Energy
b) Much smaller Energies involved; easier to lose e- from negative charged ion
B. Ionic Radii
1) Gradual decrease across a period as
Z increases (greater attraction for electrons)
2) General increase down a Group as the size
of the valence shell increases
3) Nonpolar Covalent Radii for neutral atoms
are found in Table2-7
4) Ionic Radii from crystal data are found
in Table 2-8
a) Cations are smaller than neutral atoms
b) Anions are larger than neutral atoms
c) Radius decreases as + charge increases
THANK YOU
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